Abstract
In this paper, we investigate the stationary points of functionals on the space of Riemannian metrics on a compact manifold. Special cases are spectral invariants associated with Laplace or Dirac operators such as functional determinants, and the total Q-curvature. When the functional is invariant under conformal changes of the metric and the manifold is the n-sphere, we apply methods from representation theory to give a universal form of the Hessian at a stationary point. This reveals a very strong rigidity in the local structure of any such functional. As a corollary, this gives a new proof of the results of Okikiolu on local maxima and minima for the determinant of the conformal Laplacian, and we obtain results of the same type in general examples.
| Originalsprog | Engelsk |
|---|---|
| Tidsskrift | International Mathematics Research Notices |
| Vol/bind | 2014 |
| Udgave nummer | 22 |
| ISSN | 1687-3017 |
| DOI | |
| Status | Udgivet - 1 jan. 2014 |
| Udgivet eksternt | Ja |